Ulteriori informazioni
Exploring Musical Spaces is a comprehensive synthesis of mathematical techniques in music theory, written with the aim of making these techniques accessible to music scholars without extensive prior training in mathematics.
Sommario
- Preface
- Acknowledgments
- Part I Foundations of Mathematical Music Theory: Spaces, Sets, Graphs, and Groups
- Chapter 1: Spaces I: Pitch and Pitch-Class Spaces
- Chapter 2: Sets, Functions, and Relations
- Chapter 3: Graphs
- Chapter 4: Spaces II: Chordal, Tonal, and Serial Spaces
- Chapter 5: Groups I: Interval Groups and Transformation Groups
- Part II Transformation Theory: Intervals and Transformations, including Neo-Riemannian Theory
- Chapter 6: Groups II: Permutations, Isomorphisms, and Other Topics in Group Theory
- Chapter 7: Intervals
- Chapter 8: Transformations I: Triadic Transformations
- Chapter 9: Transformations II: Transformation Graphs and Networks; Serial Transformations
- Part III Geometric Music Theory: The OPTIC Voice-Leading Spaces
- Chapter 10: Spaces III: Introduction to Voice-Leading Spaces
- Chapter 11: Spaces IV: The Geometry of OPTIC Spaces
- Chapter 12: Distances
- Part IV Theory of Scales: Diatonic and Beyond
- Chapter 13: Scales I: Diatonic Spaces
- Chapter 14: Scales II: Beyond the Diatonic
- Appendix 1: List of Musical Spaces
- Appendix 2: List of Sets and Groups
- References
Info autore
Julian Hook holds PhDs in both mathematics and music theory, as well as graduate degrees in architecture and piano performance. His work involving mathematical approaches to the study of music has appeared primarily in music theory journals but also at conferences of the American Mathematical Society and in the pages of Science. Since 2003 he has taught at Indiana University, where he is a former chair of the music theory department. He is a past president of Music Theory Midwest, and was the founding reviews editor of the Journal of Mathematics and Music.
Riassunto
Exploring Musical Spaces is a comprehensive synthesis of mathematical techniques in music theory, written with the aim of making these techniques accessible to music scholars without extensive prior training in mathematics.
Testo aggiuntivo
For anyone looking for one book to read to help them better engage with or produce scholarship in mathematical music theory, I cannot recommend Exploring Musical Spaces highly enough.
